Find the indefinite integral of ((1/2t)-(2)^(1/2)e^t)dt

Question

turingtest · Answer

$$\large\int\frac12t-2^{\frac12e^t}dt$$This?

anonymous · Answer

No, the first t is in bottom with the 2, and the second 2 is under a radical by itself and e^t is another variable not an entire exponent

anonymous · Answer

$$\Large \int \frac{1}{2t}dt- 2^{1/2} \int e^t dt$$ If that's not what you mean I suggest you, trying to $ \LaTeX$ it out yourself, so we all talk about the same problem.

anonymous · Answer

It's almost right just include e^t after the square root of 2 and take off dt till the end

anonymous · Answer

$$\int\limits_{-\infty}^{\infty}[\frac{ 1 }{ 2t }-\sqrt{2}e^t]dt$$

anonymous · Answer

is that your question?

anonymous · Answer

@Spacelimbus is right you need to tell him the right question so he can help you to provide you with the right solution.

anonymous · Answer

$$\int\limits[\frac{ 1 }{ 2t }-\sqrt{2}e^t]dt$$

anonymous · Answer

sorry this is an indefinite integral i think you are asking

anonymous · Answer

if this is the right question then the answer would be

anonymous · Answer

$$=\frac{ 1 }{ 2 }\ln(t)-2^\frac{ 1 }{2 } e^t+c$$

anonymous · Answer

otherwise help us to help you by providing the right question

anonymous · Answer

Yes that's the right question!
But how you solve it?

anonymous · Answer

Forget it, I got it, thank you